Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I have a logistic regression using glm and I would like to add a term of the form

c1(k+ac2)/(t+c2)

where k and t are columns in a data frame, a is a constant. I would like R to find best-fit values for c1 and c2. Is this possible?

If I only wanted a fixed value, say c2 = 2,

c1(k+2a)/(t+2)

I could just write

glm( model$y ~ I((model$k + 2*a)/(model$t + 2)) + model$otherterms,
  family = binomial(logit) )

which is similar to what I am doing now. But I don't think that 2 is optimal and iterating 'manually' is very time-consuming.

share|improve this question
2  
look at the function nls –  mnel Dec 19 '12 at 2:21
    
@mnel: How can I tell it that two of the parameters are equal? –  Charles Dec 22 '12 at 21:23

1 Answer 1

up vote 2 down vote accepted

You can use function gnm from package gnm.

gnm(y~Mult(1, # c1
           offset(k)+1,# c3=a*c2 
           Inv(offset(t)+1)) # c2
           +other terms, 
    family=binomial, 
    data=models)

EDIT (solution for constrained coefficients)

term_fun <- function(predLabels, varLabels){
                     paste0(predLabels[1],"*(",varLabels[1],
                            "+",predLabels[2],"*3)/(", # a=3 for example
                            varLabels[2],"+", predLabels[3],")")}

  Ratio <- function(t,x){
   list(predictors = list(C1 = 1, C2 = 1),
        variables = list(substitute(t), substitute(x)),
        term = term_fun)
  }
  class(Ratio) <- "nonlin"

  fit <- gnm(Y~Ratio(k,t), data=models, family=binomial)
share|improve this answer
    
How can I constrain c3 = a*c2 for a given value of a? For example, suppose a = 0.4. –  Charles Dec 21 '12 at 23:39
    
In other words, the second and third constants aren't independent and need to be fixed multiples of each other; how can I achieve this? –  Charles Dec 21 '12 at 23:41
    
I have added solution for constrained c3=a*c2. –  Wojciech Sobala Jan 6 '13 at 20:54
    
That is awesome and complicated. Thank you, I don't think I ever would have come up with that. –  Charles Jan 6 '13 at 21:14

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.